Primitive element pairs with a prescribed trace in the cubic extension of a finite field

Abstract

We prove that for any prime power q\3,4,5\, the cubic extension Fq3 of the finite field Fq contains a primitive element such that +-1 is also primitive, and TrFq3/Fq()=a for any prescribed a∈Fq. This completes the proof of a conjecture of Gupta, Sharma, and Cohen concerning the analogous problem over an extension of arbitrary degree n3.